- SolveSpace - Download
Under Linux, you may find SolveSpace in your distribution's package manager, or you can obtain it from the Snap Store You may also build SolveSpace from source and install it youself
- SolveSpace - parametric 3d CAD
SOLVESPACE is a free (GPLv3) parametric 3d CAD tool Applications include:
- SolveSpace - Tutorials
A 2d drawing tutorial We use SolveSpace to draw a pure 2d part So we start with a contour, and specify it using dimensions and constraints We also use special tools to split lines and curves where they intersect, and trim them against each other, and to round sharp corners
- SolveSpace - Features
Sketch sections using lines, rectangles, datum lines and points circles, arcs of a circle, datum circles cubic Bezier segments, C2 interpolating splines text in a TrueType font, exportable as vectors trims to split lines and curves where they intersect tangent arcs, to fillet lines and curves line styles for stroke color, stroke width, fill color adjustable snap grid, for entities and text
- SolveSpace - Examples
A belt-driven ball mill The images above are a mixture of parallel projections, as for the top and side views, and perspective projections for the pictorials All were generated directly from the 3d model This model makes use of lathed (solid of revolution) features for the pulleys, and for the rounded end caps of the canister It also uses a variety of assembly constraints, including point
- SolveSpace - Tutorial - Drawing an Angle Bracket
SolveSpace maintains a history of the features with which we created our part, and allows us to modify them If we modify something in an earlier group, then that change will automatically propagate into later groups, according to the constraints and other rules that we have specified
- SolveSpace - Reference
SolveSpace represents all geometry in 3d; it's possible to draw line segments anywhere, not just in some plane This freedom is not always useful, so SolveSpace also makes it possible to draw in a plane
- SolveSpace - Technology
In SolveSpace, constraints are represented as equations in a symbolic algebra system In general, these equations are solved numerically, by a modified Newton's method
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